Main menu

Tag Archives: Fields Medal

Number theorist Atle Selberg died in Princeton on Monday, at age 90. One of his major results was the “Selberg formula” that led to an elementary proof of the prime number theorem, a Fields medal in 1950, and a famous controversy with Paul Erdos.

After a lunch-time “reception” (the less said, the better), the first afternoon session is dedicated to the laudationes. An expert in the area speaks on the work of each Field Medalist and of Jon Kleinberg.

First, a mathematician from ETH Zurich (who is, however, Italian) speaks on the work of Andrei Okounkov. He studies “partitions,” which, in the simplest case, are ways of writing an integer as the sum of a non-decreasing sequence of integers. Partitions are related to the representation theory of the symmetric group, and apply in a variety of problems that were too technical for me to follow.

John Lott spoke on Perelman’s work. Lott is part of one of the three teams that have been working out complete expositions of Perelman’s work. His talk is extremely clear. The Poincare conjecture states that

every 3-dimensional manifold that is simply connected and compact is diffeomorphic to the boundary of a sphere ball in R4.

Where “simply connected” means that a simple loop can always be shrunk to a point via a continous transformation. “Diffeomorphic” means, probably, “equivalent under the appropriate type of nice continuous transformations.” The lower dimensional analog is that any surface with “no holes” can be “stretched” into the surface of a sphere ball. Even though this is a purely topological problem (the assumption is a topological property and the conclusion is a topological property), the big idea was to use methods from analysis. Specifically, Hamilton suggested in the 80s to consider a physics-inspired continuous transformation (the “Ricci flow”) on the manifold until it “rounds up” and becomes a sphere. (The continous transformation maps the starting manifold into a “diffeomorphic” one.) Unfortunately, the process produces singularities, and Hamilton had found ways to remove them in certain nicely-behaved special case. Perelman’s work shows how to always remove such singularities. This was a major tour de force. Before Perelman’s work, apparently, the experts in the area considered the known obstacles to eliminating singularities in all cases to be almost insurmountable, and did not consider Hamilton’s program to be too promising. Hamilton said that he was “as surprised as anybody else” by the fact that Perelman made the Ricci flow approach work.

Next, Fefferman delivers the laudatio for Tao. It is a daunting task given the variety of areas that Tao has worked on. Fefferman choses to talk about the Kakeya problem, about non-linear Schrodinger equations and about arithmetic progressions in the primes. By the way, both his work on the Kakeya problem and the work about arithmetic progressions (though not the work on the primes in particular) have applications in theoretical computer science.

The laudatio for Werner is a complete disaster. The speaker reads from a prepared speech, and the big screen (that, for the previous speakers, had shown slides of the presentation) shows the text of the speech. This doesn’t do justice to Werner’s work on proving rigorous results in statistical physics which were previously derived via non-rigorous methods. His work includes problems of the type that computer scientists work on. In his interview, Werner says that he feels he shares the medal with Oded Schramm and Greg Lawler. Oded Schramm, in particular, was a leading figure in this line of work, but he was already over the age limit in 2002, and this work was done after 1998, so he could never be considered for the award.

John Hopcroft delivers the laudatio for Jon Kleinberg. He emphasizes five results: the hubs-authority idea for web search ranking, his work on small-world models and algorithms, the work on “bursts” in data, the work on nearest neighbor data structures and the work on collaborative filtering. Like Fefferman, Hopcroft runs out of time.

In the late afternoon (this is a LONG day), Hamilton gives a plenary talk on his work on the Poincare conjecture. Despit Lott’s nice earlier introduction, I get rapidly lost in what seems a series of unrelated technical statements. Avi seems to follow. “No, no, they are not unrelated, he is building up an exposition of the proof by explaining all the problems and how they are overcome.” He starts late because of projector problems, and he runs enormously out of time. At one point the session chair timidly stands up, not quite sure what to do, then walks towards the podium, then walks back, apparently with Hamilton not noticing. Where is Johan Hastad when you need him?

There is a long line to enter the conference center this morning. Only at the end, I realize that invited speakers (but of course!) can skip the line and stride in. The line is because of security checks. Everybody passes through a metal detector, and bags are checked. So much security for a math conference? (Later we understand why.)

We start with a string trio (guitar, violin and cello) playing live. The sound of the violin is butchered by the sound system. Then the VIPs come on stage. Chairing the award cerimony is His Majesty Juan Carlos I, King of Spain. This is not going to be like a STOC business meeting. The King is accompanied by a person in a white military uniform with lots of stripes on his shoulders. The King sits in the middle of a table on stage, flanked by congress organizers and Spanish politicians. (The minister of Research and the mayor of Madrid.) The guy with the white uniform takes a seat behind the King. Then, one by one, everybody gets up and gives a speech.

John Ball starts his speech by explaining how mathematicians talk about their work freely, without fear that their work will be stolen, and how work is appreciated solely based on its merits, not on the way it is promoted. This is how the vast majority of mathematicians work, he continues, and exceptions are rare, and noted. It might be a reference to some of the recent events around the proof of the Poincare conjecture.

The mayor of Madrid starts what seems like a canned speech that he always gives at scientific/ technological events. Towards the end, however, he talks quite eloquently about the virtues of mathematics, its ability to make sense of a complex world, its commitment to truth, its trascendence of religion, race, and so on. Finally, he says, it is not just mathematicians that have to make an effort to come closer to the everyman and to explain the practical applications of mathematics. It is everybody’s civic duty to learn more about math and science. (He said it better.)

Griffiths starts by saying “One of the main activities of the IMU [the International Mathematical Union] in the last few years has been the selection of a new logo.” Hilarity ensues in the audience. (He seemingly did not mean it as a joke.) A documentary on the new logo is played.

More and more people talk, and at long last we come to the award of the Fields Medals. As expected, Terry Tao and Grisha Perelman receive the award, plus two other mathematicians that work in areas that I am not familiar with.

Perelman, is announced, has declined the Fields Medal. Someone from the back claps.

The Nevanlinna prize goes to Jon Kleinberg. This is definitely the computer science award with the most distinguished record, and I want to congratulate the committee for, once more, making an excellent choice. Congratulations to Jon too, of course.